Zadeh introduced theory of fuzzy sets in 1965 as generalization of crisp sets to represent uncertain, incomplete, imprecise and onconsistent information and atanassov proposed intuitionistic fuzzy sets in 1989 as gemeralization of fuzzy sets. Smarandache defined neutrosophic sets in 1995 which generalizes both fuzzy sets and intuitionistic fuzzy sets. Compared to all other logics, neutrosophic logic itroduces a model to represent the degree of indeterminacy hidden in propositions due to unexpected parameters without constraints. Some authors proposed different types of neutrosophic sets and their operations, applications in real life. In this study, we define some linear and non linear neutrosophic numbers, approximation of these numbers by trapezoidal neutrosophic numbers and some theorems related to them. In addition, an example is provided to illustrate the implications of the proposed numbers.
Volume 11 | 06-Special Issue
Pages: 377-394